说明:双击或选中下面任意单词,将显示该词的音标、读音、翻译等;选中中文或多个词,将显示翻译。
您的位置:首页 -> 词典 -> 零态响应
1)  zero-state response
零态响应
2)  zero state response
零状态响应
1.
The responses of this tentative process include three kinds: zero input response, zero state response and complete response.
在一阶电路中,由于含有动态元件,因此当电路换路后,就有一个暂态过程,其响应分为三种情况:零输入响应,规律为f(0+)e-tτ;零状态响应,规律为:非状态量为f(∞)+[fS(0+)-f(∞)]e-tτ,状态量为f(∞)(1-e-tτ);全响应规律为f(∞)+{[fS(0+)+fD(0+)]-f(∞)}e-tτ。
2.
It points out common formula of complete response of first-order circuit with contant excitation, which is f(∞)-{[fS(0+)+fD(0+)-f(∞)]}e-t/τ in this formula zero state response of non state variable is f(∞)+[fS(0+)-f(∞)]e-t/τ, and Zero state response of state variable is f(∞)[1-e-t/τ].
其中非状态量的零状态响应是f(∞)+[fS(0+)-f(∞)]e-t/τ,而状态量的零状态响应才是f(∞)[1-e-t/τ]形式;状态量和非状态量的零输入响应都具有f(0+)e-t/τ形式。
3.
This paper introduces the theory and method of analysing zero state response of lineal network by using dynamic signal analyzer.
本文介绍用动态信号分析仪分析线性网络零状态响应的原理和方法。
3)  zero-state response
零状态响应
1.
The complete solution of zero-state responsein mesoscopic LC circuit;
介观LC电路零状态响应的完全解
2.
It is proved that convolution can be able to be utilized to analyze the zero-input response and total response of a LTIVS as well as its impulse response and zero-state response.
从理论上严格证明线性时不变系统时域分析的核心是卷积,卷积不仅能计算系统冲激响应和零状态响应,也能计算系统零输入响应和全响应。
3.
In this paper,we analyze the question how to determine the limit of the convolution integral on the zero-state response of linear-time-invariant system(LTI),then discuss some questions of the improvement of graphic method and formula method in rough about computational methods of convolution integral.
本文结合连续时间LTI系统零状态响应的实例分析给出确定卷积积分上下限的一般原则,讨论利用图解法和解析法计算卷积积分的基本方法应该注意的若干问题。
4)  non zero-state response
非零状态响应
5)  residual responses at 0Hz
零频响应
6)  zero input response
零输入响应
1.
The responses of this tentative process include three kinds: zero input response, zero state response and complete response.
在一阶电路中,由于含有动态元件,因此当电路换路后,就有一个暂态过程,其响应分为三种情况:零输入响应,规律为f(0+)e-tτ;零状态响应,规律为:非状态量为f(∞)+[fS(0+)-f(∞)]e-tτ,状态量为f(∞)(1-e-tτ);全响应规律为f(∞)+{[fS(0+)+fD(0+)]-f(∞)}e-tτ。
2.
 Their zero input responses have the same form as follows: f(0+)e-t/τ.
其中非状态量的零状态响应是f(∞)+[fS(0+)-f(∞)]e-t/τ,而状态量的零状态响应才是f(∞)[1-e-t/τ]形式;状态量和非状态量的零输入响应都具有f(0+)e-t/τ形式。
3.
Three basic questions about the course of "signals and systems" are discussed:the expressions of zero input response, zero state response, and absolute response; the differential and integral characteristics of convolution integral; the differential and integral characteristics of Fourier transform.
探讨了信号与系统中的三个基本问题 :时域解零输入响应、零状态响应和全响应表达式的写法问题 ,卷积积分的微分、积分性质的运用问题 ,傅里叶变换的微分、积分特性的运用问题。
补充资料:零状态响应


零状态响应
zero state response

I一rlgZhuongtol xlongy{ng零状态响应(zero state response)在零初始状态下,由初始时刻开始施加于线性系统或线性电路的输人信号所产生的响应。 零状态响应由电路拓扑结构、元件参数和输人信号决定。线性电路或线性系统的全响应可分解为零状态响应和零输入响应之和。 求零状态响应的一种重要方法是卷积积分法。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条